Periodicity shadows I. A new approach to combinatorics of periodic algebras

This article is devoted to introduce a new notion of periodicity shadow, which appeared naturally in the study of combinatorics of tame symmetric algebras of period four, or more generally, algebras of generalized quaternion type [18]. For any such an algebra Λ, we consider its shadow $S_{\Lambda }$, which is the (signed) adjacency matrix of the Gabriel quiver of Λ. Studying properties of shadows $S_{\Lambda }$ leads us to the definition of the periodicity shadow, which is basically, a skew-symmetric integer matrix satisfying certain set of conditions motivated by the properties of shadows $S_{\Lambda }$. This turned out to be a very useful tool for describing the combinatorics of Gabriel quivers of algebras of generalized quaternion type, not only of algebras with small Gabriel quivers (i.e. up to 6 vertices), which it was originally desined for. In this paper, we introduce and briefly discuss this notion and present one of its theoretical applications, which shows how significant it is. Namely, the main result of this paper describes the global shape of the Gabriel quivers of algebras of generalized quaternion type, as quivers obtained from some basic shadows by attaching 2-cycles, and moreover, position of the 2-cycles is restricted by precise rules (see the Main Theorem). Computational aspects are reported in the second part [3].